Find the necessary confidence interval for a population mean u for the following values. (Round your answers to two decimal places.) a = 0.01, n = 34, X = 32, s² = 19 to Interpret the interval that you have constructed. O In repeated sampling, 1% of all intervals constructed in this manner will enclose the population mean. In repeated sampling, 99% of all intervals constructed in this manner will enclose the population mean. There is a 99% probability that the population mean is within the interval. There is a 1% probability that the population mean is within the interval. We know that 99% of population is within the interval.

Find the necessary confidence interval for a population mean u for the following values. (Round your answers to two decimal places.) a = 0.01, n = 34, X = 32, s² = 19 to Interpret the interval that you have constructed. O In repeated sampling, 1% of all intervals constructed in this manner will enclose the population mean. In repeated sampling, 99% of all intervals constructed in this manner will enclose the population mean. There is a 99% probability that the population mean is within the interval. There is a 1% probability that the population mean is within the interval. We know that 99% of population is within the interval.

Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018

18th Edition

ISBN:9780079039897

Author:Carter

Publisher:Carter

Chapter10: Statistics

Section10.5: Comparing Sets Of Data

Problem 14PPS

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Question

I need help with all parts of this question 17

Find the necessary confidence interval for a population mean u for the following values. (Round your answers to two decimal places.)
a = 0.01, n = 34, X = 32, s² = 19
to
Interpret the interval that you have constructed.
O In repeated sampling, 1% of all intervals constructed in this manner will enclose the population mean.
In repeated sampling, 99% of all intervals constructed in this manner will enclose the population mean.
There is a 99% probability that the population mean is within the interval.
There is a 1% probability that the population mean is within the interval.
We know that 99% of population is within the interval.

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